Decoding method and apparatus, and system therefor

ABSTRACT

A method includes: receiving a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; dividing the received to-be-decoded symbol sequence into a first symbol sequence and a second symbol sequence; calculating first distances between the first symbol sequence and each of corresponding 2 K  ideal superimposed symbol sequences, and obtaining paths corresponding to relatively small distances based on the first distances; sequentially performing sequence detection on each symbol in the second symbol sequence based on the paths corresponding to the 2 k-1  relatively small distances, calculating second distances between each symbol in the second symbol sequence and each ideal symbol sequence, and after the sequence detection is performed on a last symbol, obtaining an ideal symbol sequence corresponding to a minimum distance based on the second distances; and using the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.

CROSS REFERENCE TO RELATED APPLICATIONS

This application is a continuation of PCT/CN2016/111404 filed on Dec. 22, 2016, which claims priority to Chinese patent application No. 201510969778.8 of Dec. 22, 2015; Chinese patent application No. 201510970075.7 of Dec. 22, 2015; Chinese patent application No. 201510970271.4 of Dec. 22, 2015; and Chinese patent application No. 201510970071.9 of Dec. 22, 2015, all of which are incorporated herein by reference.

TECHNICAL FIELD

The present invention relates to signal decoding in a wireless communications system, and in particular, to a decoding method and apparatus applied to an overlapped multiplexing system, and a system thereof.

BACKGROUND

An ideal expected objective of people for a wireless communications system is: A signal is transmitted in a channel in a distortionless manner, and effective information can be obtained at a receive end through efficient, fast, and fully correct decoding. In an actual system, because a real channel environment is relatively complex, some information is usually distorted in a signal transmission procedure. To obtain effective information through full decoding, a transmit end and a receive end need to use a relatively large transmit power and signal-to-noise ratio to transmit a signal, so that information can be correctly decoded at the receive end. However, the transmit power cannot be increased unlimitedly. Therefore, an efficient and correct decoding method needs to be found.

In the prior art, during sequence detection, a Hamming distance is used to select a best path at most time. However, the Hamming distance requires that hard decision processing first be performed on received data to convert the received data into a {0, 1} sequence, and then real data obtained after the decision be compared with ideal data to determine a quantity of same data. A sequence includes only 0 and 1. In an actual system, there is a relatively high probability that two-path data have a same Hamming distance. In addition, the data obtained after the hard decision has a certain error, making it difficult to accurately select the best path, thereby reducing a decoding success rate of the system.

SUMMARY

A technical issue to be resolved in the present invention is to provide a decoding method and apparatus, and a system thereof, so that a relatively high decoding success rate can be achieved under an equivalent condition.

Therefore, the present invention provides a decoding method and apparatus, and a system including the apparatus.

An aspect of the present invention provides a decoding method, including:

-   -   receiving a to-be-decoded symbol sequence, where the         to-be-decoded symbol sequence includes N symbols;     -   dividing the received to-be-decoded symbol sequence into a first         symbol sequence (1:K) and a second symbol sequence (K+1:N),         where K is less than N;     -   calculating first distances between the first symbol sequence         (1:K) and each of corresponding 2^(K) ideal superimposed symbol         sequences, and obtaining paths corresponding to 2^(k-1)         relatively small distances based on the first distances;     -   sequentially performing sequence detection on each symbol in the         second symbol sequence (K+1:N) based on the paths corresponding         to the 2^(k-1) relatively small distances, calculating second         distances between each symbol in the second symbol sequence and         each of the corresponding 2^(K) ideal symbol sequences, and         after the sequence detection is performed on a last symbol,         obtaining an ideal symbol sequence corresponding to a minimum         distance based on the second distances; and     -   using the ideal symbol sequence corresponding to the minimum         distance as an output symbol sequence.

Another aspect of the present invention provides a decoding apparatus, including: a unit configured to receive a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols;

-   -   a unit configured to divide the received to-be-decoded symbol         sequence into a first symbol sequence (1:K) and a second symbol         sequence (K+1:N), where K is less than N;     -   a unit configured to calculate first distances between the first         symbol sequence (1:K) and each of corresponding 2^(K) ideal         superimposed symbol sequences, and obtain paths corresponding to         2^(k-1) relatively small distances based on the first distances;     -   a unit configured to sequentially perform sequence detection on         each symbol in the second symbol sequence (K+1:N) based on the         paths corresponding to the 2^(k-1) relatively small distances,         calculate second distances between each symbol in the second         symbol sequence and each of the corresponding 2^(K) ideal symbol         sequences, and after the sequence detection is performed on a         last symbol, obtain an ideal symbol sequence corresponding to a         minimum distance based on the second distances; and     -   a unit configured to use the ideal symbol sequence corresponding         to the minimum distance as an output symbol sequence.

Another aspect of the present invention provides a decoding method, including: receiving a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols;

-   -   generating 2^(K) ideal superimposed symbol sequences obtained         after K ideal symbol sequences are superimposed, where K is less         than N;     -   sequentially calculating first distances between a current         symbol y_(i) and each ideal superimposed symbol sequence, where         i=K˜N;     -   obtaining, based on the first distances, second distances         obtained after accumulation of the current symbol;     -   after a last symbol y^(N) is processed, obtaining an ideal         symbol sequence corresponding to a minimum accumulated distance         based on the second distances; and     -   using the ideal symbol sequence corresponding to the minimum         accumulated distance as an output symbol sequence.

An aspect of the present invention provides a decoding apparatus, including:

-   -   a unit configured to receive a to-be-decoded symbol sequence,         where the to-be-decoded symbol sequence includes N symbols;     -   a unit configured to generate 2^(K) ideal superimposed symbol         sequences obtained after K ideal symbol sequences are         superimposed, where K is less than N;     -   a unit configured to sequentially calculate first distances         between a current symbol y_(i) and each ideal superimposed         symbol sequence, where i=K˜N;     -   a unit configured to obtain, based on the first distances,         second distances obtained after accumulation of the current         symbol;     -   a unit configured to: after a last symbol y^(N) is processed,         obtain an ideal symbol sequence corresponding to a minimum         accumulated distance based on the second distances; and     -   a unit configured to use the ideal symbol sequence corresponding         to the minimum accumulated distance as an output symbol         sequence.

Generally, a length of to-be-decoded data is relatively large, and an accumulated distance increases as a decoding depth increases. If a system performs decoding output after all data is decoded, system resource consumption is relatively large. Therefore, a better processing method is used for a path storage capacity and distance storage. Usually, a path storage length of 4K-5K is selected. In this case, if a path memory is full but decoding decision output has not been performed, decision output may be performed forcibly, and the output is first performed for initial nodes having a same path. The accumulated distance increases as the decoding depth increases. In this case, the accumulated distance may be stored as a relative distance. In other words, a reference distance is defined, and a value of the reference distance varies depending on a system. In distance storage, a relative value of a second distance of each path relative to the reference distance is recorded. During selection of a best path, comparison is performed based on the relative distance.

BRIEF DESCRIPTION OF DRAWINGS

To make the objectives, features, and advantages of the present invention easier to understand, the following describes, in detail, specific implementations of the present invention with reference to the accompanying drawings.

FIG. 1 is an example flowchart of a transmit signal generation procedure in an OvTDM system;

FIG. 2 is an example block diagram of a modulation unit in an OvTDM system;

FIG. 3 is an example flowchart of a decoding method applied to an OvTDM system according to an embodiment of the present invention;

FIG. 4 is a flowchart of a preprocessing procedure before a to-be-decoded signal is decoded in a decoding method applied to an OvTDM system according to an embodiment of the present invention;

FIG. 5 is an example diagram of a symbol superimposition procedure according to an embodiment of the present invention;

FIG. 6 is an example diagram of a permutation of the first K columns of symbols and symbol superimposition according to an embodiment of the present invention;

FIG. 7 is a node state transition diagram according to an embodiment of the present invention;

FIG. 8 is an input-output relationship tree diagram of an OvTDM system according to an embodiment of the present invention;

FIG. 9 is a K=3 OvTDM Trellis diagram according to an embodiment of the present invention;

FIG. 10 is a symbol sequence detection path diagram according to an embodiment of the present invention;

FIG. 11 is an example flowchart of a decoding method applied to a truncated OvTDM system according to an embodiment of the present invention;

FIG. 12 is a flowchart of a preprocessing procedure before a to-be-decoded signal is decoded in a decoding method applied to a truncated OvTDM system according to an embodiment of the present invention;

FIG. 13 is an input-output relationship tree diagram of a truncated OvTDM system according to an embodiment of the present invention;

FIG. 14 is a K=3 truncated OvTDM Trellis diagram according to an embodiment of the present invention; and

FIG. 15 is a symbol sequence detection path diagram according to an embodiment of the present invention.

DESCRIPTION OF EMBODIMENTS

The following further describes the present invention with reference to specific embodiments and accompanying drawings. The following descriptions illustrate more details to help fully understand the present invention. However, the present invention apparently can be implemented in a plurality of other manners different from the descriptions. A person skilled in the art may perform similar extension and derivation based on actual application circumstances without departing from connotations of the present invention. Therefore, content of the specific embodiments should not be constituted as a limitation to the protection scope of the present invention.

FIG. 1 is an example flowchart of a transmit signal generation procedure in a system. The transmit signal generation procedure 100 includes: Step 102: Design and generate a transmit signal envelope waveform h(t). Step 104: Perform a specific time shift on the designed envelope waveform h(t), to form transmit signal envelope waveforms h(t−i×ΔT) of other moments. Step 106: Multiply a to-be-transmitted symbol x_(i) by an envelope waveform h(t−i×ΔT) of a corresponding moment that is generated in step 104, to obtain to-be-transmitted signal waveforms x_(i)h(t−i×ΔT) of the moments. Step 108: Superimpose the to-be-transmitted signal waveforms x_(i)h(t−i×ΔT), to form a transmit signal. In this embodiment, the transmit signal may be represented as

${s(t)} = {\sum\limits_{i}\; {x_{i}{{h\left( {t - {i \times \Delta \; T}} \right)}.}}}$

FIG. 2 is an example block diagram of a modulation unit in a system. The modulation unit 200 includes: an envelope waveform generator 210, configured to generate a transmit signal envelope waveform; a shifter 220, configured to perform a specific time shift on the designed envelope waveform, to form transmit signal envelope waveforms of other moments; a multiplier 230, configured to multiply a to-be-transmitted symbol by an envelope waveform of a corresponding moment that is generated in the shifter 220, to obtain to-be-transmitted signal waveforms of the moments; and a superimposer 240, configured to superimpose the to-be-transmitted signal waveforms, to form a transmit signal.

FIG. 3 is an example flowchart of a decoding method applied to an OvTDM system according to an embodiment of the present invention. The decoding method 300 includes: Step 302: Receive a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols. Step 304: Divide the received to-be-decoded symbol sequence into a first symbol sequence (1:K) and a second symbol sequence (K+1:N), where K is the quantity of times of overlapped multiplexing. Step 306: Calculate first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences, and obtain paths corresponding to 2^(k-1) relatively small distances based on the first distances. Step 308: Sequentially perform sequence detection on each symbol in the second symbol sequence (K+1:N) based on the paths corresponding to the 2^(k-1) relatively small distances, calculate second distances between each symbol and each of the corresponding 2^(K) ideal superimposed symbol sequences, and after the sequence detection is performed on a last symbol, obtain an ideal symbol sequence corresponding to a minimum distance based on the second distances. Step 310: Use the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.

In an embodiment, both the first distances and the second distances are measure distances.

In an embodiment, the calculating first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences includes: generating, based on K symbols included in the first symbol sequence, all 2^(K) possible transmit symbol sequences corresponding to the K symbols; dividing all the possible transmit symbol sequences into a first part and a second part based on a first symbol in all the 2^(K) possible transmit symbol sequences, where each part includes 2^(k-1) possible transmit symbol sequences; sequentially accumulating each group of symbols in all the possible transmit symbol sequences level by level, to obtain K ideal superimposed symbol sequences; calculating a distance between a symbol in the first symbol sequence and each ideal superimposed symbol sequence, to obtain 2^(K) paths; and comparing distances of two corresponding possible transmit symbol sequences that are respectively in the first part and the second part and that are different only in a first symbol, to obtain 2^(k-1) relatively small distances and use the 2^(k-1) relatively small distances as the first distances.

In an embodiment, the calculating second distances between each symbol and each of the corresponding 2^(K) ideal symbol sequences includes: generating the 2^(K) ideal symbol sequences obtained after K symbols are superimposed; determining a state of a previous node of a current symbol; obtaining a state transition path based on the state of the previous node; and obtaining 2^(k-1) relatively small distances between the current symbol and ideal symbols based on the state transition path, and using the 2^(k-1) relatively small distances as the second distances.

In an embodiment, the second distances are distances obtained after accumulation of the current symbol.

In an implementable embodiment, the system is changed to an OvFDM system. In this case, at a stage of receiving a decoding signal, the received signal needs to be converted from a frequency domain to a time domain, that is, including: receiving a to-be-decoded signal; converting the to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; dividing the received to-be-decoded symbol sequence into a first symbol sequence (1:K) and a second symbol sequence (K+1:N); calculating first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences, and obtaining paths corresponding to 2^(k-1) relatively small distances based on the first distances; sequentially performing sequence detection on each symbol in the second symbol sequence (K+1:N) based on the paths corresponding to the 2^(k-1) relatively small distances, calculating second distances between each symbol and each of the corresponding 2^(K) ideal symbol sequences, and after the sequence detection is performed on a last symbol, obtaining an ideal symbol sequence corresponding to a minimum distance based on the second distances; and using the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.

Afterwards, subsequent decoding is performed.

Decoding on y_(i)(1:K) Symbols

The K symbols are represented as ã₀, ã₁, . . . , and ã_(k-1). The K symbols are combined and permutated, and there are a total of 2^(K) types of possible combination information. A combination form is ±ã₀ ±ã₁ . . . ã_(k-1), and may be represented as msg(2^(K)*K). A matrix msg may be divided into an upper part and a lower part: msg_(sub1) and msg_(sub2). Each part includes 2^(k-1) rows. Sizes of the two parts are msg_(sub1)(2^(K-1)*K) and msg_(sub2)(2^(K-1)*K). An only difference between the two parts lies in a first symbol ±1, and permutations and combinations of the following K−1 symbols in the upper part are the same as those in the lower part. That is, whether the first symbol belongs to a +1 branch or a −1 branch can be distinguished based on upper and lower grouping.

A result of sequentially accumulating each group of symbols level by level is recorded sequentially, to obtain each ideal superimposed symbol combination, which may be represented as a matrix M(2^(K)*K), that is, 2^(K) rows and K columns. The matrix is represented as [±ã₀ ±ã₀ ±ã₁ . . . ±ã₀ ±ã₁ . . . ±ã_(k-1)]. A first column is a possible permutation of a first group of symbols, a second column is a possible permutation of the first two groups of symbols that are superimposed, a third column is a possible permutation of the first three groups of symbols that are superimposed, and so on, and a K^(th) column is a possible permutation of all K groups of symbols that are superimposed. The matrix M may be divided into an upper part and a lower part: M_(sub1) and M_(sub2), to distinguish whether a new incoming symbol is +1 or −1. Each part includes 2^(k-1) rows. Sizes of the two parts are M_(sub1)(2^(K-1)*K) and M_(sub2)(2^(K-1)*K).

The first K symbols y(1:K) are taken from the received to-be-decoded symbol sequence y_(i) (i=1˜N). A measure distance between each of the K symbols and each row in the matrix M is calculated sequentially. The measure distance may be represented as d=^(p)√{square root over (|y_(i)−x_(i)|^(p))}, 0<p<∞, and is an Euclidean distance when p is 2. The Euclidean distance is a real distance between two signals, can truly reflect a distance between an actual signal and an ideal signal, and may be correspondingly represented as

$d = \sqrt{\sum\limits_{i}^{N}\; \left( {y_{i} - x_{i}} \right)^{2}}$

(which means a real distance between two vectors). There are a total of 2^(K) paths. Because an only difference between the matrixes M_(sub1) and M_(sub2) lies in a first symbol, only 2^(k-1) possible paths are retained each time a best path is calculated for K groups of symbols.

A comparison procedure is: respectively calculating measure distances between y(1:K) and first rows in M_(sub1) and M_(sub2), finding a path with a smaller distance of the two distances, recording a measure distance d₁ of this path and a corresponding symbol sequence path path₁ in msg, and discarding the other path; then, respectively calculating measure distances between y(1:K) and second rows in M_(sub1) and M_(sub2), retaining a best path, recording a measure distance d₂ of this path and a corresponding symbol sequence path path₂ in msg, and discarding the other path; and so on, until a (2^(k-1))^(th) row.

2^(k-1) best paths are finally obtained. Measure distances of the paths are recorded as d_(i), i=1˜2^(K-1) and represented as d₁, d₂ . . . d₂ _(K-1) . Symbol sequence paths are recorded as path_(i), i=1˜2^(K-1) and represented as path₁, path₂, . . . path₂ _(K-1) . Because only the first K symbols are parsed, a path depth of each path is K in this case.

Decoding on y_(i)(K+1:N) Symbols

The first K symbols are decoded during decoding on the y(1:K) symbols. In addition, the 2^(k-1) best paths path_(i) and corresponding accumulated measure distances d_(i) are finally obtained. Each symbol after the K symbols is a possible result obtained after K symbols are superimposed. Therefore, sequence detection is sequentially performed on (K+1:N) symbols, and a total of N−K sequence detection procedures are performed. Sequence detection steps are as follows:

Generate possible states obtained after K symbols are superimposed, namely, ideal symbols S_(theory)(i), i=1˜2^(K). There are a total of 2^(k) possible states. A corresponding representation form after superimposition is ±ã₀ ±ã₁ . . . ±ã_(k-1). If ±1 is used to represent an output level after superimposition, after the K symbols are superimposed, only K+1 symbol levels are possibly included, which are sequentially ±K, ±(K−2), . . . , and ±(K−2^(i)), where i=1˜K/2, and recorded as Y_(theory)(index), index=1˜K+1.

Determine a state of a previous node of a current symbol y_(i) (i=k+1˜N). The 2^(k-1) path_(i) are obtained during decoding on the y(1:K) symbols, that is, there are a total of 2^(k-1) states. In a symbol superimposition procedure, a first symbol is a new symbol, and the rest K−1 symbols are symbol states of the previous node. Therefore, path(i−(K−1):i−1) is compared with the 2^(k-1) possible states, to determine the state of the previous node.

Determine a node state transition path. Two new states (enter +1/−1) are generated for each node after state transition, that is, the 2^(k-1) states change to 2^(K) states after node transition.

Determine a measure distance between a current symbol y_(i) and an ideal symbol S_(theory)(i):

${{d_{current}(i)} = \sqrt[p]{\left( {y - {S_{theory}(i)}} \right)^{p}}},{i = {1 \sim 2^{K}}},{0 < p < {\infty.}}$

When p is 2, the measure distance is an Euclidean distance. The Euclidean distance is a real distance between two signals, and can truly reflect a distance between an actual signal and an ideal signal. A corresponding expression is:

d _(current)(i)=√{square root over ((y−S _(theory)(i))²)}, i=1˜2^(K).

In an embodiment, if a multiplexing waveform is a square wave, a measure distance can be directly calculated by using Y_(theory)(index).

Calculate an accumulated measure distance. An expression of the accumulated measure distance is recorded as:

${D_{m,n} = {{d_{i}\left( \frac{n + 1}{2} \right)} + {d_{current}(n)}}},{m = {{K + 1} \sim N}},{n = {1 \sim 2^{K}}}$ i = m − 1,

where D_(m,n) represents a measure distance obtained after accumulation of the current symbol, m represents an index of the current symbol in an entire received symbol sequence, n represents an index of an accumulated symbol (there are a total of 2^(K) indexes), and d_(i) represents an accumulated measure distance after a current node previously performs selection (there are a total of 2^(k-1) accumulated measure distances). In actual processing, a d_(i) value corresponding to a (K+1)^(th) symbol is the measure distance d_(i) in the foregoing decoding on the y(1:K) symbols; a d_(i) value of a (K+2)^(th) symbol changes to D_((k+1)); and so on; and a d_(i) value of an N^(th) symbol changes to D_((N-1)). A value of d_(current) is always the measure distance between the current symbol and the ideal symbol.

Select a best path. After the foregoing processing, 2^(K) measure distances D_(m,n) and paths path_(i) are obtained. The 2^(K) paths may be generally divided into two parts, that is, whether +1 or −1 is entered in a previous state. Therefore, the 2^(K) paths are divided into two parts, and each part includes 2^(k-1) paths. A measure distance of each row in each part is compared with that of each corresponding row in the other part. That is, a first row in a first part is compared with a first row in a second part, a second row in the first part is compared with a second row in the second part, and so on. A minimum measure distance of each row is calculated. An accumulated measure distance D_(m,n) corresponding to this row is recorded and marked as a new measure distance d. In addition, a corresponding symbol path is retained. Enter +1 or enter −1 for a current symbol based on a transition path, and increase a depth of a corresponding path by 1. Therefore, 2^(k-1) measure distances and 2^(k-1) corresponding symbol paths are further obtained.

Sequentially process the K+1 to N symbols based on the foregoing steps. When a last symbol y_(N) is processed, the 2^(k-1) measure distances d and the corresponding 2^(k-1) symbol paths are obtained. In this case, a path depth is N. Sort the 2^(k-1) measure distances in ascending order. Find a measure distance with a smallest accumulated distance, and obtain an index corresponding to the measure distance. Based on the index, take a decoded symbol sequence of an index corresponding to the path. The decoded symbol sequence is a final decoding result. Record a decoded sequence as S_(decoder)(i), i=1˜N. Compare the decoded sequence S_(decoder)(i) with an input sequence x_(i), to check whether the decoding result is correct and calculate a bit error rate of the system.

Referring to FIG. 4, before a to-be-decoded signal is decoded, a decoding method applied to an OvTDM system according to an embodiment of the present invention may further include a preprocessing procedure 400. The preprocessing procedure 400 includes: 402: Synchronize a received to-be-decoded signal with the OvTDM system, where the synchronization may be timing synchronization or carrier synchronization. 404: Perform channel estimation on the received to-be-decoded signal after the synchronization is completed, where the channel estimation is used to estimate a parameter of an actual transmission channel. 406: Perform digital processing on the received to-be-decoded signal based on a sampling theorem, where the digital processing may include cutting a received waveform based on a waveform transmit time interval.

According to the decoding method applied to the OvTDM system in the present invention, a decoding procedure is divided into two parts: (1:K) decoding and (K+1:N) decoding. One-time processing is performed on the first K signals. The K signals are sequentially accumulated level by level to obtain new K ideal signals. Measure distances of the new ideal signals are sequentially calculated by using the first K signals in an actual received symbol sequence. 2^(k-1) best paths are retained. An actual accurate path is definitely included in the 2^(k-1) paths, thereby improving a decoding success rate. However, for a truncated system, the first K−1 symbols of the system are known, that is, in a communication procedure, a transmit end and a receive end of the first K−1 symbols know each other and reach an agreement, and the first K−1 symbols do not need to be decoded. A decoding sequence starts from a K^(th) symbol, namely, y_(i)(K:N). A total of N−K+1 symbol sequences need to be detected. By using the truncated system, decoding efficiency can be improved, and system design complexity can be reduced.

A measure distance is used to select a best path. The measure distance represents a distance between two signals. During selection of the best path, a path with a smallest measure distance is selected as the best path. Therefore, a path closest to an ideal signal can be accurately found, thereby improving a decoding success rate of a system.

When measure distances are compared, if only a measure distance between a current symbol and an ideal symbol is compared, a best path may have a deviation as a decoding depth increases, and consequently, a final decoding success rate decreases. K symbols are overlapped with each other in a symbol superimposition procedure, and the symbols are closely associated. Therefore, a best path may be determined by using a current measure distance and a sum of previously accumulated measure distances. In this way, the best path can be determined more accurately as the decoding depth increases, thereby improving the decoding success rate.

In a specific embodiment of the present invention, an encoding/decoding procedure is described by using a square wave as a multiplexing waveform. The quantity of times K of overlapped multiplexing is set to 3. As shown in FIG. 5, an input sequence is x_(i)={+1 +1 −1 +1 −1 +1 +1 +1 −1 +1}, and an encoded output sequence is s(t)={+1 +2 +1 +1 −1 +1 +1 +3 +1 +1}. As shown in FIG. 5, the first two symbols of the encoded output are not superimposition results of three signals.

An encoded signal is transmitted through an actual channel. A to-be-decoded symbol sequence received at a receive end has a deviation and is recorded as y_(i), where i=1˜10. A received symbol sequence in this embodiment is y_(i)={−0.0123, 1.0439, 0.369, 0.6781, −0.5921, 1.0252, 0.2574, 2.0371, 0.8769, 0.9036}. When p in a measure distance

${d = \sqrt[p]{{{y_{i} - x_{i}}}^{p}}},{0 < p < \infty}$

is 2, the measure distance is correspondingly an Euclidean distance. Decoding steps are described by using the Euclidean distance as an example.

First, decode the first three symbols. As shown in FIG. 6, there are a total of eight permutations and combinations, forming an 8×3 matrix. Symbols are sequentially accumulated level by level, forming the 8×3 matrix. The matrix is divided into two parts: M_(sub1) and M_(sub2). A difference between M_(sub1) and M_(sub2) lies in: A first symbol of M_(sub1) is 1, and a first symbol of M_(sub2) is −1; alternatively, a first symbol of M_(sub1) is −1, and a first symbol of M_(sub2) is 1.

Compare an Euclidean distance between the first three symbols of y_(i) and a first row in the matrix M with that between the first three symbols of y_(i) and a fifth row in the matrix M, compare an Euclidean distance between the first three symbols of y_(i) and a second row in the matrix M with that between the first three symbols of y_(i) and a sixth row in the matrix M, . . . , and compare an Euclidean distance between the first three symbols of y_(i) and a fourth row in the matrix M with that between the first three symbols of y_(i) and an eighth row in the matrix M, to obtain Euclidean distances of the fifth row, the second row, the third row, and the fourth row, which are respectively recorded as d1, d2, d3, and d4. In addition, a path corresponding to each row is recorded, namely, a fifth row, a second row, a third row, and a fourth row of msg. Therefore, four possible paths are obtained from decoding of the first three symbols, a symbol sequence corresponding to the paths is: path₁: (−1 1 1), path₂: (1 1 −1), path₃: (1 −1 1), path₄: (1 −1 −1).

Then, decode the fourth to tenth symbols. When K=3, there are four states: a, b, c, and d. Corresponding symbols are (1, 1), (1, −1), (−1, 1), and (−1, −1). Each time, the last two symbols in a path sequence are compared with the four states, to determine a state of a previous node. For a transition path, refer to a node state transition diagram. Based on the node state transition diagram in FIG. 7, it can be learned that path₁ is corresponding to a node a, path₂ is corresponding to a node b, path₃ is corresponding to a node c, and path₄ is corresponding to a node d. When K=3, an input-output relationship diagram is shown in FIG. 8. It can be learned from the figure that the node a is (1, 1), the node b is (1, −1), the node c is (−1, 1), and the node d is (−1, −1).

When K=3, there are a total of four possible symbol levels after superimposition: ±3 and ±1, that is, Y_(theory)(1)=−3, Y_(theory)(2)=−1, Y_(theory)(3)=1, and Y_(theory)(4)=3. Corresponding ideal symbol representation forms are respectively: S_(theory) (1)=ã₀+ã₁+ã₂, S_(theory)(2)=ã₀+ã₁−ã₂, S_(theory)(3)=ã₀−ã₁+ã₂, S_(theory) (4)=ã₀−ã₁−ã₂, S_(theory)(5)=−ã₀+ã₁+ã₂, S_(theory)(6)=−ã₀+ã₁−ã₂, S_(theory)(7)=−ã₀−ã₁+ã₂, and S_(theory)(8)=−ã₀−ã₁−ã₂.

Respectively calculate Euclidean distances by using a fourth symbol y₄ and the four levels:

When a path node is a, +3 is obtained after +1 is entered, that is, node transition is a->a, and an Euclidean distance obtained by using y₄ and +3 is recorded as d_(current)(1); +1 is obtained after −1 is entered, that is, node transition is a->b, and an Euclidean distance obtained by using y₄ and +1 is recorded as d_(current)(2).

When a path node is b, +1 is obtained after +1 is entered, that is, node transition is b->c, and an Euclidean distance obtained by using y₄ and +1 is recorded as d_(current)(3); −1 is obtained after −1 is entered, that is, node transition is b->d, and an Euclidean distance obtained by using y₄ and −1 is recorded as d_(current)(4).

When a path node is c, +1 is obtained after +1 is entered, that is, node transition is c->a, and an Euclidean distance obtained by using y₄ and +1 is recorded as d_(current)(5); −1 is obtained after −1 is entered, that is, node transition is c->b, and an Euclidean distance obtained by using y₄ and −1 is recorded as d_(current)(6).

When a path node is d, −1 is obtained after +1 is entered, that is, node transition is d->c, and an Euclidean distance obtained by using y₄ and −1 is recorded as d_(current)(7); −3 is obtained after −1 is entered, that is, node transition is d->d, and an Euclidean distance obtained by using y₄ and −3 is recorded as d_(current)(8).

Respectively add the Euclidean distance d_(current) of the current symbol up to Euclidean distances d_(i) corresponding to the first three symbols, to obtain accumulated distances, that is, D_(4,1)=d₁+d_(current)(1), D_(4,2)=d₁+d_(current)(2); D_(4,3)=d₂+d_(current)(3), D_(4,4)=d₂+d_(current)(4); D_(4,5)=d₃+d_(current)(5), D_(4,6)=d₃+d_(current) (6); D_(4,7)=d₄+d_(current) (7), and D_(4,8)=d₄+d_(current) (8).

Calculate a best path.

Compare Euclidean distances D_(4,1) and D_(4,5). It is learned that the Euclidean distance D_(4,5) is smaller. Record the smaller Euclidean distance D_(4,5) and mark it as a new d₁. A path corresponding to a previous accumulated Euclidean distance d₃ of a current node in the D_(4,5) is a path₃ sequence. Therefore, increase a depth of the path₃ from 3 to 4, and record a fourth symbol as +1. A new symbol path sequence (1 −1 1 1) is obtained. Record the symbol path sequence as a new path₁.

Compare Euclidean distances D_(4,2) and D_(4,6). It is learned that the Euclidean distance D_(4,2) is smaller. Record the smaller Euclidean distance D_(4,2) and mark it as a new d₂. A path corresponding to a previous accumulated Euclidean distance d₁ of a current node in the D_(4,2) is a path₁ sequence. Therefore, increase a depth of the path₁ from 3 to 4, and record a fourth symbol as −1. A new symbol path sequence (−1 1 1 −1) is obtained. Record the symbol path sequence as a new path₂.

Compare Euclidean distances D_(4,3) and D_(4,7). It is learned that the Euclidean distance D_(4,3) is smaller. Record the smaller Euclidean distance D_(4,3) and mark it as a new d₃. A path corresponding to a previous accumulated Euclidean distance d₂ of a current node in the D_(4,3) is a path₂ sequence. Therefore, increase a depth of the path₂ from 3 to 4, and record a fourth symbol as +1. A new symbol path sequence (1 1 −1 1) is obtained. Record the symbol path sequence as a new path₃.

Compare Euclidean distances D_(4,4) and D_(4,8). It is learned that the Euclidean distance D_(4,4) is smaller. Record the smaller Euclidean distance D_(4,4) and mark it as a new d₄. A path corresponding to a previous accumulated Euclidean distance d₂ of a current node in the D_(4,4) is a path₂ sequence. Therefore, increase a depth of the path₂ from 3 to 4, and record a fourth symbol as −1. A new symbol path sequence (1 1 −1 −1) is obtained. Record the symbol path sequence as a new path₄.

To sum up, the following new possible best paths are obtained: path₁: (1 −1 1 1), path₂ (−1 1 1 −1), path₃: (1 1 −1 1), and path₄: (1 1 −1 −1).

Complete decoding all symbols. Likewise, perform sequence detection on the fifth to tenth symbols based on the foregoing method. Referring to a K=3 Trellis diagram in FIG. 9, an obtained symbol detection procedure is shown in FIG. 10. Finally obtained symbol sequences are sequentially: path₁: (1 1 −1 1 −1 1 1 1 1 1), path₂: (1 1 −1 1 −1 1 1 1 1 −1), path₃: (1 1 −1 1 −1 1 1 1 −1 1), and path₄: (1 1 −1 1 −1 1 1 1 −1 −1). By comparing the path₁, path₂, path₃, and path₄, it can be found that paths with a same initial node in a path memory are gradually unified as a decoding depth increases. Therefore, paths with a same initial node among paths can be first output in a decoding procedure, to save storage space.

Corresponding Euclidean distances are sequentially d₁=3.5071, d₂=3.0049, d₃=2.4493, and d₄=3.6040. By comparing the four distances, it can be learned that the Euclidean distance d₃ is the smallest. Correspondingly, the path₃ is selected as the output symbol sequence. That is, the output symbol sequence is S_(decode)=(1 1 −1 1 −1 1 1 1 −1 1). Compared with the input symbol sequence x_(i)={+1 +1 −1 +1 −1 +1 +1 +1 −1 +1}, the two sequences are completely the same, indicating that a decoding result is correct.

In the present invention, a decoding apparatus applied to an OvTDM system includes: a unit configured to receive a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; a unit configured to divide the received to-be-decoded symbol sequence into a first symbol sequence (1:K) and a second symbol sequence (K+1:N); a unit configured to calculate first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences, and obtain paths corresponding to 2^(k-1) relatively small distances based on the first distances; a unit configured to sequentially perform sequence detection on each symbol in the second symbol sequence (K+1:N) based on the paths corresponding to the 2^(k-1) relatively small distances, calculate second distances between each symbol and each of the corresponding 2^(K) ideal symbol sequences, and after the sequence detection is performed on a last symbol, obtain an ideal symbol sequence corresponding to a minimum distance based on the second distances; and a unit configured to use the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.

In an embodiment, both the first distances and the second distances are measure distances.

In an embodiment, the second distances are distances obtained after accumulation of the current symbol.

In an embodiment, a decoding apparatus corresponding to an OvFDM system is provided. Compared with the decoding apparatus in the OvTDM system, a processing apparatus is added at a signal receiving stage in this decoding apparatus, to convert a frequency-domain signal into a time-domain signal. That is, the decoding apparatus applied to the OvFDM system in the present invention includes: a unit configured to receive a to-be-decoded signal; a unit configured to convert the to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; a unit configured to divide the received to-be-decoded symbol sequence into a first symbol sequence (1:K) and a second symbol sequence (K+1:N); a unit configured to calculate first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences, and obtain paths corresponding to 2^(k-1) relatively small distances based on the first distances; a unit configured to sequentially perform sequence detection on each symbol in the second symbol sequence (K+1:N) based on the paths corresponding to the 2^(k-1) relatively small distances, calculate second distances between each symbol and each of the corresponding 2^(K) ideal symbol sequences, and after the sequence detection is performed on a last symbol, obtain an ideal symbol sequence corresponding to a minimum distance based on the second distances; and a unit configured to use the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.

The decoding apparatus applied to the OvTDM/OvFDM system according to this embodiment of the present invention further includes a preprocessing unit configured to perform preprocessing on the to-be-decoded symbol sequence. The preprocessing unit includes: a synchronizer, configured to synchronize the received to-be-decoded signal with the system, where the synchronization may be timing synchronization or carrier synchronization; a channel estimator, configured to perform channel estimation on the received to-be-decoded signal after the synchronization is completed, where the channel estimation is used to estimate a parameter of an actual transmission channel; and a digital processor, configured to perform digital processing on the received to-be-decoded signal based on a sampling theorem.

According to the decoding apparatus applied to the OvTDM system in the present invention, a decoding procedure is divided into two parts: (1:K) decoding and (K+1:N) decoding. One-time processing is performed on the first K signals. The K signals are sequentially accumulated level by level to obtain new K ideal signals. Measure distances of the new ideal signals are sequentially calculated by using the first K signals in an actual received symbol sequence. 2^(k-1) best paths are retained. An actual accurate path is definitely included in the 2^(k-1) paths, thereby improving a decoding success rate. However, for a truncated system, the first K−1 symbols of the system are known, that is, in a communication procedure, a transmit end and a receive end of the first K−1 symbols know each other and reach an agreement, and the first K−1 symbols do not need to be decoded. A decoding sequence starts from a K^(th) symbol, namely, y_(i)(K:N). A total of N−K+1 symbol sequences need to be detected. By using the truncated system, decoding efficiency can be improved, and system design complexity can be reduced.

A measure distance is used to select a best path. The measure distance represents a distance between two signals. During selection of the best path, a path with a smallest measure distance is selected as the best path. Therefore, a path closest to an ideal signal can be accurately found, thereby improving a decoding success rate of a system.

When measure distances are compared, if only a measure distance between a current symbol and an ideal symbol is compared, a best path may have a deviation as a decoding depth increases, and consequently, a final decoding success rate decreases. K symbols are overlapped with each other in a symbol superimposition procedure, and the symbols are closely associated. Therefore, a best path may be determined by using a current measure distance and a sum of previously accumulated measure distances. In this way, the best path can be determined more accurately as the decoding depth increases, thereby improving the decoding success rate.

Generally, a length of to-be-decoded data is relatively large, and an accumulated distance increases as a decoding depth increases. If a system performs decoding output after all data is decoded, system resource consumption is relatively large. Therefore, a better processing method is used for a path storage capacity and distance storage. Usually, a path storage length of 4K-5K is selected. In this case, if a path memory is full but decoding decision output has not been performed, decision output may be performed forcibly, and the output is first performed for initial nodes having a same path. The accumulated distance increases as the decoding depth increases. In this case, the accumulated distance may be stored as a relative distance. In other words, a reference distance is defined, and a value of the reference distance varies depending on a system. In distance storage, a relative value of a second distance of each path relative to the reference distance is recorded. During selection of a best path, comparison is performed based on the relative distance.

The decoding apparatus applied to the OvTDM/OvFDM system in the foregoing embodiment of the present invention may be combined in the OvTDM/OvFDM system.

The present invention may be further applied to a truncated OvTDM/OvFDM system. In the truncated OvTDM/OvFDM system, considering that the first K−1 symbols y_(i)(1:K−1) in superimposed symbols do not result from superimposition of K symbols, decoding on the first K−1 symbols is relatively complex in an actual decoding procedure. Therefore, a truncated system may be designed and exist, and in the system, the first K−1 symbols are known, that is, in a communication procedure, a transmit end and a receive end of the first K−1 symbols know each other and reach an agreement, and the first K−1 symbols do not need to be decoded. A decoding sequence starts from a K^(th) symbol, namely, y_(i)(K:N). A total of N−K+1 symbol sequences need to be detected.

FIG. 11 is an example flowchart of a decoding method applied to a truncated OvTDM system according to an embodiment of the present invention. The decoding method 1100 includes: Step 1102: Receive a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols. Step 1104: Generate 2^(K) ideal superimposed symbol sequences obtained after K ideal symbol sequences are superimposed. Step 1106: Sequentially calculate first distances between a current symbol y_(i) and each ideal superimposed symbol sequence, where i=K˜N. Step 1108: Obtain, based on the first distances, second distances obtained after accumulation of the current symbol. Step 1110: After a last symbol y_(N) is processed, obtain an ideal symbol sequence corresponding to a minimum accumulated distance based on the second distances. Step 1112: Use the ideal symbol sequence corresponding to the minimum accumulated distance as an output symbol sequence.

In this case, for a truncated OvFDM system, at a stage of receiving a decoding signal, the received signal needs to be converted from a frequency domain to a time domain, that is, including: receiving a to-be-decoded signal, and converting the to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; generating 2^(K) ideal superimposed symbol sequences obtained after K ideal symbol sequences are superimposed; sequentially calculating first distances between a current symbol y_(i) and each ideal superimposed symbol sequence, where i=K˜N; obtaining, based on the first distances, second distances obtained after accumulation of the current symbol; after a last symbol y_(N) is processed, obtaining an ideal symbol sequence corresponding to a minimum accumulated distance based on the second distances; and using the ideal symbol sequence corresponding to the minimum accumulated distance as an output symbol sequence.

According to an embodiment of the present invention, K is the quantity of times of overlapped multiplexing.

According to an embodiment of the present invention, both the first distances and the second distances are measure distances.

According to an aspect of the present invention, the obtaining, based on the first distances, second distances obtained after accumulation of the current symbol includes: obtaining an accumulated distance of a previous node of the current symbol; and using, as the second distances, sums of the first distances between the current symbol and ideal symbols and the accumulated distance of the previous node of the current symbol.

In an embodiment of the present invention, N symbol sequences are received for the received signal, and a corresponding sequence is y_(i). Because the first K−1 symbols y_(i)(1:K−1) do not result from superimposition of K symbols, decoding on the first K−1 symbols is relatively complex in an actual decoding procedure. Therefore, a truncated OvTDM system may be designed and exist, and in the system, the first K−1 symbols are known, that is, in a communication procedure, a transmit end and a receive end of the first K−1 symbols know each other and reach an agreement, and the first K−1 symbols do not need to be decoded. A decoding sequence starts from a K^(th) symbol, namely, y_(i)(K:N). A total of N−K+1 symbol sequences need to be detected.

Decoding on y_(i)(K:N) Symbols

Generate possible states obtained after K symbols are superimposed, namely, ideal symbols S_(theory)(i), i=1˜2^(K). There are a total of 2^(k) possible states. The K symbols are represented as ã₀, ã₁, . . . , and ã_(k-1), and a corresponding representation form after superimposition is ±ã₀ ±ã₁ . . . ±ã_(k-1). If ±1 is used to represent an output level after superimposition, after the K symbols are superimposed, only K+1 symbol levels are possibly included, which are sequentially ±K, ±(K−2), . . . , and ±(K−2^(i)), where i=1˜K/2 and recorded as Y_(theory)(index), index=1˜K+1.

Sequentially calculate measure distances by using a current symbol y_(i) and the foregoing generated 2^(k) ideal symbols S_(theory) (i), to obtain 2^(k) measure distances. The measure distance may be represented as

${d = \sqrt[p]{{{y_{i} - x_{i}}}^{p}}},{0 < p < \infty},$

and is an Euclidean distance when p is 2. The Euclidean distance is a real distance between two signals, can truly reflect a distance between an actual signal and an ideal signal, and may be correspondingly represented as:

d _(current)(i)=√{square root over ((y−S _(theory)(i))²)}, i=1˜2^(K).

Calculate an accumulated measure distance. An expression of the accumulated measure distance is recorded as:

${D_{m,n} = {{d_{i}\left( \frac{n + 1}{2} \right)} + {d_{current}(n)}}},{m = {{K + 1} \sim N}},{n = {1 \sim 2^{K}}}$ i = m − 1,

where D_(m,n) represents a measure distance obtained after accumulation of the current symbol, m represents an index of the current symbol in an entire received symbol sequence, n represents an index of an accumulated symbol (there are a total of 2^(K) indexes), and d_(i) represents an accumulated measure distance after a current node previously performs selection. Because an only difference between the 2^(K) states lies in a first symbol, only 2^(k-1) measure distances and 2^(k-1) best paths are finally retained. Because the first K−1 symbols are not processed, it is considered by default that a d_(i) value corresponding to a K^(th) symbol is the same, a path depth is K−1, and a path sequence is set to 0. Starting from a (K+1)^(th) symbol, a d_(i) value changes to D_(m,n), that is, an accumulated measure distance of a previous node, and so on, and a d_(i) value of an N^(th) symbol changes to D_((N-1)).

Select a best path. After the foregoing processing, 2^(K) Euclidean distances D_(m,n) and paths path_(i) are obtained. The 2^(K) paths may be generally divided into two parts, that is, whether +1 or −1 is entered in a previous state. Therefore, the 2^(K) paths are divided into two parts, and each part includes 2^(k-1) paths. A measure distance of each row in each part is compared with that of each corresponding row in the other part. That is, a first row in a first part is compared with a first row in a second part, a second row in the first part is compared with a second row in the second part, and so on. A minimum Euclidean distance of each row is calculated. An accumulated measure distance D_(m,n) corresponding to this row is recorded and marked as a new measure distance d_(i). In addition, a corresponding symbol path is retained. Enter +1 or enter −1 for a current symbol based on a transition path, and increase a depth of a corresponding path by 1. After the processing in the foregoing steps, 2^(k-1) measure distances and 2^(k-1) corresponding symbol paths are further obtained.

Sequentially process the K to N symbols based on the foregoing steps. When a last symbol y_(N) is processed, the 2^(k-1) measure distances d and the corresponding 2^(k-1) symbol paths are obtained. In this case, a path depth is N. Sort the 2^(k-1) measure distances in ascending order. Find a measure distance with a smallest accumulated distance, and obtain an index corresponding to the measure distance. Based on the index, take a decoded symbol sequence of an index corresponding to the path. The decoded symbol sequence is a final decoding result. Record a decoded sequence as S_(decoder) (i), i=1˜N. Compare the decoded sequence S_(decoder)(i) with an input sequence x_(i)(K:N), to check whether the decoding result is correct and calculate a bit error rate of the system.

Referring to FIG. 12, before a to-be-decoded signal is decoded, a decoding method applied to a truncated OvTDM system according to an embodiment of the present invention may further include a preprocessing procedure 1200. The preprocessing procedure 1200 includes: 1202: Synchronize a received to-be-decoded signal with the truncated OvTDM system, where the synchronization may be timing synchronization or carrier synchronization. 1204: Perform channel estimation on the received to-be-decoded signal after the synchronization is completed, where the channel estimation is used to estimate a parameter of an actual transmission channel. 1206: Perform digital processing on the received to-be-decoded signal based on a sampling theorem, where the digital processing may include cutting a received waveform based on a waveform transmit time interval.

According to the decoding method applied to the truncated OvTDM system in the present invention, a measure distance is used to select a best path. The measure distance represents a distance between two signals. During selection of the best path, a path with a smallest measure distance is selected as the best path. Therefore, a path closest to an ideal signal can be accurately found, thereby improving a decoding success rate of the system.

When measure distances are compared, if only a measure distance between a current symbol and an ideal symbol is compared, a best path may have a deviation as a decoding depth increases, and consequently, a final decoding success rate decreases. K symbols are overlapped with each other in a symbol superimposition procedure, and the symbols are closely associated. Therefore, a best path may be determined by using a current measure distance and a sum of previously accumulated measure distances. In this way, the best path can be determined more accurately as the decoding depth increases, thereby improving the decoding success rate.

For the truncated system, the first K−1 symbols of the system are known, that is, in a communication procedure, a transmit end and a receive end of the first K−1 symbols know each other and reach an agreement, and the first K−1 symbols do not need to be decoded. A decoding sequence starts from a K^(th) symbol, namely, y_(i)(K:N). A total of N−K+1 symbol sequences need to be detected. By using the truncated system, decoding efficiency can be improved, and system design complexity can be reduced.

In a specific embodiment of the present invention, an encoding/decoding procedure is described by using a square wave as a multiplexing waveform. The number of times K of overlapped multiplexing is set to 3. As shown in FIG. 13, an input sequence x_(i)={+1 +1 −1 +1 −1 +1 +1 +1 −1 +1}, and an encoded output sequence is s(t)={+1 +2 +1 +1 −1 +1 +1 +3 +1 +1}. As shown in FIG. 13, the first two symbols of the encoded output are not superimposition results of three signals.

An encoded signal is transmitted through an actual channel. A to-be-decoded symbol sequence received at a receive end has a deviation and is recorded as y_(i), where i=1˜10. A received symbol sequence in this embodiment is y_(i)={−0.0123, 1.0439, 0.369, 0.6781, −0.5921, 1.0252, 0.2574, 2.0371, 0.8769, 0.9036}. When p in a measure distance

${d = \sqrt[p]{{{y_{i} - x_{i}}}^{p}}},{0 < p < \infty}$

is 2, the measure distance is correspondingly an Euclidean distance. Decoding steps are described by using the Euclidean distance as an example.

First, generate possible states, namely, ideal symbols S_(theory)(i), obtained after K=3 symbols are superimposed.

When K=3, there are a total of eight states after the symbols are superimposed: S_(theory) (1)=ã₀+ã₁+ã₂, S_(theory)(2)=ã₀+ã₁−ã₂, S_(theory)(3)=ã₀−ã₁+ã₂, S_(theory)(4)=ã₀−ã₁−ã₂, S_(theory)(5)=−ã₀+ã₁+ã₂, S_(theory)(6)=−ã₀+ã₁−ã₂, S_(theory)(7)=−ã₀−ã₁+ã₂, and S_(theory)(8)=−ã₀−ã₁−ã₂. Correspondingly, there are a total of four output symbol levels: ±3 and ±1.

Calculate Euclidean distances of a current symbol.

Respectively calculate Euclidean distances by using a third symbol y₃ and the eight ideal symbols, and record the Euclidean distances as d_(current)(i), i=1˜8. An Euclidean distance calculated by using y₃ and S_(theory)(1) is recorded as d_(current)(1), an Euclidean distance calculated by using y₃ and S_(theory)(2) is recorded as d_(current)(2), and so no, and an Euclidean distance calculated by using y₃ and S_(theory)(8) is recorded as d_(current)(8).

Calculate an accumulated Euclidean distance of the current symbol.

The accumulated Euclidean distance is represented as

${D_{m,n} = {{d_{i}\left( \frac{n + 1}{2} \right)} + {d_{current}(n)}}},{m = {{K + 1} \sim N}},{n = {1 \sim 2^{K}}}$ i = m − 1.

In this embodiment, it is considered by default that all four Euclidean distances d₂ of the first two nodes are 1, and all corresponding symbol paths are 0. Then, a d₂ value corresponding to a third symbol is the same and is 1. Starting from a fourth symbol, a d_(i) value changes to D_(m,n), that is, an accumulated Euclidean distance of a previous node, and so on, and a d_(i) value of a tenth symbol changes to D₉.

Select a best path.

It can be learned from S_(theory)(i) that a difference between an upper part and a lower part of S_(theory)(i) lies in that first symbols are different (+1, −1), and permutations and combinations of the following two symbols are correspondingly the same. Based on this phenomenon, it can be distinguished whether a new incoming symbol is +1 or −1.

Compare Euclidean distances D_(3,1) and D_(3,5). It is learned that the Euclidean distance D_(3,5) is smaller. Record the smaller Euclidean distance D_(3,5) and mark it as a new d₁. Increase a path depth from 2 to 3, and record a third symbol as +1. A new symbol path sequence (0 0 1) is obtained. Record the symbol path sequence as a new path₁.

Compare Euclidean distances D_(3,2) and D_(3,6). It is learned that the Euclidean distance D_(3,2) is smaller. Record the smaller Euclidean distance D_(3,2) and mark it as a new d₂. Increase a path depth from 2 to 3, and record a third symbol as −1. A new symbol path sequence (0 0 −1) is obtained. Record the symbol path sequence as a new path₂.

Compare Euclidean distances D_(3,3) and D_(3,7). It is learned that the Euclidean distance D_(3,3) is smaller. Record the smaller Euclidean distance D_(3,3) and mark it as a new d₃. Increase a path depth from 2 to 3, and record a third symbol as +1. A new symbol path sequence (0 0 1) is obtained. Record the symbol path sequence as a new path₃.

Compare Euclidean distances D_(3,4) and D_(3,8). It is learned that the Euclidean distance D_(3,4) is smaller. Record the smaller Euclidean distance D_(3,4) and mark it as a new d₄. Increase a path depth from 2 to 3, and record a third symbol as −1. A new symbol path sequence (0 0 −1) is obtained. Record the symbol path sequence as a new path₄.

To sum up, the following new possible best paths are obtained: path₁: (0 0 1), path₂: (0 0 −1), path₃: (0 0 1), and path₄: (0 0 −1).

Likewise, perform sequence detection on the fifth to tenth symbols based on the foregoing method. Referring to a K=3 OvTDM Trellis diagram in FIG. 14, an obtained symbol detection procedure is shown in FIG. 15. Finally obtained symbol sequences are sequentially:

-   -   path₁: (0 0 −1 1 −1 1 1 1 1 1), path₂: (0 0 −1 1 −1 1 1 1 1 −1),     -   path₃: (0 0 −1 1 −1 1 1 1 −1 1), path₄: (0 0 −1 1 −1 1 1 1 −1         −1).

By comparing the path₁, path₂, path₃, and path₄, it can be found that paths with a same initial node in a path memory are gradually unified as a decoding depth increases. Therefore, paths with a same initial node among paths can be first output in a decoding procedure, to save storage space.

Corresponding Euclidean distances are sequentially d₁=3.5071, d₂=3.0049, d₃=2.4493, and d₄=3.6040. By comparing the four distances, it can be learned that the Euclidean distance d₃ is the smallest. Correspondingly, the path₃ is selected as the output symbol sequence.

That is, it is considered that the output symbol sequence is S_(decode)(3:10)=(−1 1 −1 1 1 1 −1 1), and the input symbol sequence is x_(i)={+1 +1 −1 +1 −1 +1 +1 +1 −1 +1}, where x(3:10)={−1 +1 −1 +1 +1 +1 −1 +1}. By comparing S_(decode)(3:10) and x(3:10), the two sequences are completely the same, indicating that a decoding result is correct.

In the present invention, a decoding apparatus applied to a truncated OvTDM system includes: a unit configured to receive a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; a unit configured to generate 2^(K) ideal superimposed symbol sequences obtained after K ideal symbol sequences are superimposed; a unit configured to sequentially calculate first distances between a current symbol y_(i) and each ideal superimposed symbol sequence, where i=K˜N; a unit configured to obtain, based on the first distances, second distances obtained after accumulation of the current symbol; a unit configured to: after a last symbol y_(N) is processed, obtain an ideal symbol sequence corresponding to a minimum accumulated distance based on the second distances; and a unit configured to use the ideal symbol sequence corresponding to the minimum accumulated distance as an output symbol sequence.

The present invention may be further applied to a truncated OvFDM system. Compared with the decoding apparatus in the truncated OvTDM system, a processing apparatus is added at a signal receiving stage in this decoding apparatus, to convert a frequency-domain signal into a time-domain signal. That is, the decoding apparatus applied to the OvFDM system includes: a unit configured to receive a to-be-decoded signal; a unit configured to convert the to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence, where the to-be-decoded symbol sequence includes N symbols; a unit configured to generate 2^(K) ideal superimposed symbol sequences obtained after K ideal symbol sequences are superimposed; a unit configured to sequentially calculate first distances between a current symbol y_(i) and each ideal superimposed symbol sequence, where i=K˜N; a unit configured to obtain, based on the first distances, second distances obtained after accumulation of the current symbol; a unit configured to: after a last symbol y_(N) is processed, obtain an ideal symbol sequence corresponding to a minimum accumulated distance based on the second distances; and a unit configured to use the ideal symbol sequence corresponding to the minimum accumulated distance as an output symbol sequence.

According to an aspect of the present invention, K is the quantity of times of overlapped multiplexing.

According to an aspect of the present invention, both the first distances and the second distances are measure distances.

The decoding apparatus applied to the truncated OvTDM/OvFDM system according to this embodiment of the present invention further includes a preprocessing unit configured to perform preprocessing on the to-be-decoded symbol sequence. The preprocessing unit includes: a synchronizer, configured to synchronize the received to-be-decoded signal with the system, where the synchronization may be timing synchronization or carrier synchronization; a channel estimator, configured to perform channel estimation on the received to-be-decoded signal after the synchronization is completed, where the channel estimation is used to estimate a parameter of an actual transmission channel; and a digital processor, configured to perform digital processing on the received to-be-decoded signal based on a sampling theorem.

According to the decoding apparatus applied to the truncated OvTDM/OvFDM system in the present invention, a measure distance is used to select a best path. The measure distance represents a distance between two signals. During selection of the best path, a path with a smallest measure distance is selected as the best path. Therefore, a path closest to an ideal signal can be accurately found, thereby improving a decoding success rate of the system.

When measure distances are compared, if only a measure distance between a current symbol and an ideal symbol is compared, a best path may have a deviation as a decoding depth increases, and consequently, a final decoding success rate decreases. K symbols are overlapped with each other in a symbol superimposition procedure, and the symbols are closely associated. Therefore, a best path may be determined by using a current measure distance and a sum of previously accumulated measure distances. In this way, the best path can be determined more accurately as the decoding depth increases, thereby improving the decoding success rate.

For the truncated system, the first K−1 symbols of the system are known, that is, in a communication procedure, a transmit end and a receive end of the first K−1 symbols know each other and reach an agreement, and the first K−1 symbols do not need to be decoded. A decoding sequence starts from a K^(th) symbol, namely, y_(i)(K:N) A total of N−K+1 symbol sequences need to be detected. By using the truncated system, decoding efficiency can be improved, and system design complexity can be reduced.

It can be learned from the foregoing embodiments that a difference between the truncated and non-truncated manners mainly lies in: In the non-truncated manner, the to-be-decoded symbol sequence is divided into the first symbol sequence (1:K) and the second symbol sequence (K+1:N), and then the first distances between the first symbol sequence (1:K) and each of the corresponding 2^(K) ideal superimposed symbol sequences are calculated.

However, in the truncated manner, the first distances between the K^(th) to the N^(th) symbol and each ideal superimposed symbol sequence are calculated, and then the second distances obtained after accumulation of the current symbol are obtained based on the first distances.

It can be learned that, based on the truncated manner, a division point of symbols 1 to N changes from K to K+1, and then the first distances between the symbol sequence 1 to K and each of the corresponding 2^(K) ideal superimposed symbol sequences are calculated, and the truncated manner changes to the non-truncated manner.

Generally, a length of to-be-decoded data is relatively large, and an accumulated distance increases as a decoding depth increases. If a system performs decoding output after all data is decoded, system resource consumption is relatively large. Therefore, a better processing method is used for a path storage capacity and distance storage. Usually, a path storage length of 4K-5K is selected. In this case, if a path memory is full but decoding decision output has not been performed, decision output may be performed forcibly, and the output is first performed for initial nodes having a same path. The accumulated distance increases as the decoding depth increases. In this case, the accumulated distance may be stored as a relative distance. In other words, a reference distance is defined, and a value of the reference distance varies depending on a system. In distance storage, a relative value of a second distance of each path relative to the reference distance is recorded. During selection of a best path, comparison is performed based on the relative distance.

Although the present invention is described with reference to the current specific embodiments, a person of ordinary skill in the art should be aware that the foregoing embodiments are merely used to describe the present invention, and various equivalent modifications or replacements may be made without departing from the spirit of the present invention. Therefore, modifications and variations made to the foregoing embodiments within the essential spirit and scope of the present invention shall fall within the scope of the claims of this application. 

What is claimed is:
 1. A decoding method, comprising: receiving a to-be-decoded symbol sequence, wherein the to-be-decoded symbol sequence comprises N symbols; dividing the received to-be-decoded symbol sequence into a first symbol sequence (1:K) and a second symbol sequence (K+1:N), wherein K is less than N; calculating first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences, and obtaining paths corresponding to 2^(k-1) relatively small distances based on the first distances; sequentially performing sequence detection on each symbol in the second symbol sequence (K+1:N) based on the paths corresponding to the 2^(k-1) relatively small distances, calculating second distances between each symbol in the second symbol sequence and each of the corresponding 2^(K) ideal symbol sequences, and after the sequence detection is performed on a last symbol, obtaining an ideal symbol sequence corresponding to a minimum distance based on the second distances; and using the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.
 2. The decoding method according to claim 1, wherein when the decoding method is applied to an OvFDM system, the step of receiving a to-be-decoded symbol sequence further comprises: receiving a to-be-decoded signal, and converting the to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence.
 3. The decoding method according to claim 1, wherein both the first distances and the second distances are measure distances.
 4. The decoding method according to claim 1, wherein the calculating first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences comprises: generating, based on a quantity K of symbols comprised in the first symbol sequence, all 2^(K) possible transmit symbol sequences corresponding to the K symbols; dividing all the possible transmit symbol sequences into a first part and a second part based on a first symbol in all the 2^(K) possible transmit symbol sequences, wherein each part comprises 2^(k-1) possible transmit symbol sequences; sequentially accumulating each group of symbols in all the possible transmit symbol sequences level by level, to obtain K ideal superimposed symbol sequences; calculating a distance between a symbol in the first symbol sequence and each ideal superimposed symbol sequence, to obtain 2^(K) paths; and comparing distances of two corresponding possible transmit symbol sequences that are respectively in the first part and the second part and that are different only in a first symbol, to obtain 2^(k-1) relatively small distances and use the 2^(k-1) relatively small distances as the first distances.
 5. The decoding method according to claim 1, wherein the calculating second distances between each symbol and each of the corresponding 2^(K) ideal symbol sequences comprises: generating the 2^(K) ideal symbol sequences obtained after K symbols are superimposed; determining a state of a previous node of a current symbol; obtaining a state transition path based on the state of the previous node; and obtaining 2^(k-1) relatively small distances between the current symbol and ideal symbols based on the state transition path, and using the 2^(k-1) relatively small distances as the second distances.
 6. The decoding method according to claim 1, wherein the second distances are distances obtained after accumulation of the current symbol.
 7. A decoding apparatus, comprising: a unit configured to receive a to-be-decoded symbol sequence, where the to-be-decoded symbol sequence comprises N symbols; a unit configured to divide the received to-be-decoded symbol sequence into a first symbol sequence (1:K) and a second symbol sequence (K+1:N), wherein K is less than N; a unit configured to calculate first distances between the first symbol sequence (1:K) and each of corresponding 2^(K) ideal superimposed symbol sequences, and obtain paths corresponding to 2^(k-1) relatively small distances based on the first distances; a unit configured to sequentially perform sequence detection on each symbol in the second symbol sequence (K+1:N) based on the paths corresponding to the 2^(k-1) relatively small distances, calculate second distances between each symbol in the second symbol sequence and each of the corresponding 2^(K) ideal symbol sequences, and after the sequence detection is performed on a last symbol, obtain an ideal symbol sequence corresponding to a minimum distance based on the second distances; and a unit configured to use the ideal symbol sequence corresponding to the minimum distance as an output symbol sequence.
 8. The decoding apparatus according to claim 7, wherein when the decoding apparatus is applied to an OvFDM system, the decoding apparatus further comprises: a unit configured to convert a to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence.
 9. The decoding apparatus according to claim 7, wherein both the first distances and the second distances are measure distances.
 10. A decoding method, comprising: receiving a to-be-decoded symbol sequence, wherein the to-be-decoded symbol sequence comprises N symbols; generating 2^(K) ideal superimposed symbol sequences obtained after K ideal symbol sequences are superimposed, wherein K is less than N; sequentially calculating first distances between a current symbol y_(i) and each ideal superimposed symbol sequence, wherein i=K˜N; obtaining, based on the first distances, second distances obtained after accumulation of the current symbol; after a last symbol y_(N) is processed, obtaining an ideal symbol sequence corresponding to a minimum accumulated distance based on the second distances; and using the ideal symbol sequence corresponding to the minimum accumulated distance as an output symbol sequence.
 11. The decoding method according to claim 10, wherein when the decoding method is applied to an OvFDM system, the step of receiving a to-be-decoded symbol sequence further comprises: receiving a to-be-decoded signal, and converting the to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence.
 12. The decoding method according to claim 10, wherein K is the number of times of overlapped multiplexing.
 13. The decoding method according to claim 10, wherein both the first distances and the second distances are measure distances.
 14. The decoding method according to claim 10, wherein the obtaining, based on the first distances, second distances obtained after accumulation of the current symbol comprises: obtaining an accumulated distance of a previous node of the current symbol; and using, as the second distances, sums of the first distances between the current symbol and ideal symbols and the accumulated distance of the previous node of the current symbol.
 15. A decoding apparatus, comprising: a unit configured to receive a to-be-decoded symbol sequence, wherein the to-be-decoded symbol sequence comprises N symbols; a unit configured to generate 2^(K) ideal superimposed symbol sequences obtained after K ideal symbol sequences are superimposed, wherein K is less than N; a unit configured to sequentially calculate first distances between a current symbol y_(i) and each ideal superimposed symbol sequence, wherein i=K˜N; a unit configured to obtain, based on the first distances, second distances obtained after accumulation of the current symbol; a unit configured to: after a last symbol y_(N) is processed, obtain an ideal symbol sequence corresponding to a minimum accumulated distance based on the second distances; and a unit configured to use the ideal symbol sequence corresponding to the minimum accumulated distance as an output symbol sequence.
 16. The decoding apparatus according to claim 15, wherein when the decoding apparatus is applied to an OvFDM system, the decoding apparatus further comprises: a unit configured to convert a to-be-decoded signal into a frequency-domain to-be-decoded symbol sequence.
 17. The decoding apparatus according to claim 15, wherein K is the number of times of overlapped multiplexing.
 18. The decoding apparatus according to claim 15, wherein both the first distances and the second distances are measure distances. 